A picture of a storm caused by Hurricane Grace, the Halloween Storm of 1991.

The evolution of the phase of a perturbed stationary solution of the NLS
equation with periodic potential.

Nonlinear Waves Research Group

Department of Applied Mathematics, University of Washington
Mathematics Department, Seattle University

Research Participants

Faculty
John D. Carter (SU)
Bernard Deconinck (UW)
Jeffrey DiFranco (SU)
J. Nathan Kutz (UW)

Graduate Students
Brandon Bale (UW)
Chris Curtis (UW)
Edwin Ding (UW)
David Lovit (UW)
Mike Nivala (UW)
Katie Oliveras (UW)

Undergraduate Students
Nate Bottman (UW)
Beth Carey (UW)
Wilhemina Chik (SU)
Danae Delacruz (UW)
Eddie Feeley (SU)
Hannah Hedeen (UW)
Leland Jefferis (SU)
Colin McGrath (UW)
Jonathan Tu (UW)
Anennya Veeraraghavan (UW)

Cookies or equivalent are served before and during the presentation. All presentations are informal. Questions and interactions are encouraged. If you have suggestions for speakers or are volunteering to give a talk please contact John Carter, Bernard Deconinck or Nathan Kutz .

The Nonlinear Waves Research Group deals with a variety of application areas, ranging from Bose-Einstein condensates and nonlinear optics to water waves. Mathematical methods useful in these areas and others are considered as well.

A picture of a storm caused by Hurricane Grace, the Halloween Storm of 1991.

Nonlinear Waves Research Group

Department of Applied Mathematics, University of Washington Mathematics Department, Seattle University

Research Participants

Department of Applied Mathematics, University of Washington
Mathematics Department, Seattle University